1978 Unimodal Tearing Chaos

It is known that for producing a chaotic behavior, sensitivity to initial conditions is combined to some recurrence properties. These two specific characteristics result from two mechanisms : stretching and squeezing. This can be produced by a folding or a tearing. Typically, an attractor involving a folding is produced by the Rössler system and involving a tearing is the Lorenz system. These two mechanisms were investigated in [1]. Unimodal tearing chaos corresponds to an attractor with a tearing mechanism that is characterized by a cusp --- or Lorenz --- map. The Lorenz system is a good example but it has a rotation symmetry. The purpose here is to have an attractor with a tearing mechanism without any symmetry.

The system

From our knowledge, the first set of polynomial equations that was
identified to produce a chaotic attractor bounded by a genus-1 torus and
possessing a Lorenz map was proposed by Rössler and Ortoleva [2] as an isothermal abstract reaction system. The systems reads :

This abstract chemical reaction produces a unimodal tearing chaotic
attractor as shown in Fig. 1. Parameter values are a=33, b=150, c=1, d=3.5, e=4815, f=410, g=0.59, h=4, j=2.5, k=2.5, l=5.29, m=750, K1=0.01 and
K2=0.01. A first-return map to a Poincaré
section (Fig. 2) has the shape of the Lorenz map as expected.
The l-value is slightly modified to obtain a Lorenz map without a gap between the two monotonic branches as originally
published [2].